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MATH356 (W1)
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Methods of Applied Mathematics |
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16 |
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This module discusses techniques and methods necessary for problem solving. |
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Complex functions and the Cauchy-Riemann conditions. Contour integrals and the Cauchy integral formula. Taylor’s theorem, Laurent series and residue theory. Special functions. Theory of Fourier series, applications to series solutions of ordinary differential equations. Integral transform theory, Fourier analysis and applications to partial differential equations. |
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Class tests and/or assignments (33%), 3h exam (67%). |
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30% Class mark, 80% attendance at lectures & tutorials. |
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in Semester 1. |